# Fireflies

Fireflies: new software for interactively exploring dynamical systems using GPU computing. In nonlinear systems, where explicit analytic solutions usually cannot be found, visualization is a powerful approach which can give insights into the dynamical behavior of models; it is also crucial for teaching this area of mathematics. In this paper, we present new software, Fireflies, which exploits the power of graphical processing unit (GPU) computing to produce spectacular interactive visualizations of arbitrary systems of ordinary differential equations. In contrast to typical phase portraits, Fireflies draws the current position of trajectories (projected onto 2D or 3D space) as single points of light, which move as the system is simulated. Due to the massively parallel nature of GPU hardware, Fireflies is able to simulate millions of trajectories in parallel (even on standard desktop computer hardware), producing “swarms” of particles that move around the screen in real-time according to the equations of the system. Particles that move forwards in time reveal stable attractors (e.g. fixed points and limit cycles), while the option of integrating another group of trajectories backwards in time can reveal unstable objects (repellers). Fireflies allows the user to change the parameters of the system as it is running, in order to see the effect that they have on the dynamics and to observe bifurcations. We demonstrate the capabilities of the software with three examples: a 2D “mean field” model of neuronal activity, the classical Lorenz system, and a 15D model of three interacting biologically realistic neurons.

## References in zbMATH (referenced in 1 article , 1 standard article )

Showing result 1 of 1.

Sorted by year (